//
// Copyright 2010 Ettus Research LLC
// Copyright 2018 Ettus Research, a National Instruments Company
//
// SPDX-License-Identifier: GPL-3.0-or-later
//

#ifndef ASCII_ART_DFT_HPP
#define ASCII_ART_DFT_HPP

#include <complex>
#include <cstddef>
#include <stdexcept>
#include <string>
#include <vector>

namespace ascii_art_dft {

//! Type produced by the log power DFT function
typedef std::vector<float> log_pwr_dft_type;

/*!
 * Get a logarithmic power DFT of the input samples.
 * Samples are expected to be in the range [-1.0, 1.0].
 * \param samps a pointer to an array of complex samples
 * \param nsamps the number of samples in the array
 * \return a real range of DFT bins in units of dB
 */
template <typename T>
log_pwr_dft_type log_pwr_dft(const std::complex<T>* samps, size_t nsamps);

/*!
 * Convert a DFT to a piroundable ascii plot.
 * \param dft the log power dft bins
 * \param width the frame width in characters
 * \param height the frame height in characters
 * \param samp_rate the sample rate in Sps
 * \param dc_freq the DC frequency in Hz
 * \param dyn_rng the dynamic range in dB
 * \param ref_lvl the reference level in dB
 * \return the plot as an ascii string
 */
std::string dft_to_plot(const log_pwr_dft_type& dft,
    size_t width,
    size_t height,
    double samp_rate,
    double dc_freq,
    float dyn_rng,
    float ref_lvl);

} // namespace ascii_art_dft

/***********************************************************************
 * Implementation includes
 **********************************************************************/
#include <algorithm>
#include <cmath>
#include <sstream>

/***********************************************************************
 * Helper functions
 **********************************************************************/
namespace { /*anon*/

static const double pi = double(std::acos(-1.0));

//! Round a floating-point value to the nearest integer
template <typename T>
int iround(T val)
{
    return (val > 0) ? int(val + 0.5) : int(val - 0.5);
}

//! Pick the closest number that is nice to display
template <typename T>
T to_clean_num(const T num)
{
    if (num == 0)
        return 0;
    const T pow10 = std::pow(T(10), int(std::floor(std::log10(std::abs(num)))));
    const T norm  = std::abs(num) / pow10;
    static const int cleans[] = {1, 2, 5, 10};
    int clean                 = cleans[0];
    for (size_t i = 1; i < sizeof(cleans) / sizeof(cleans[0]); i++) {
        if (std::abs(norm - cleans[i]) < std::abs(norm - clean))
            clean = cleans[i];
    }
    return ((num < 0) ? -1 : 1) * clean * pow10;
}

//! Compute an FFT with pre-computed factors using Cooley-Tukey
template <typename T>
std::complex<T> ct_fft_f(const std::complex<T>* samps,
    size_t nsamps,
    const std::complex<T>* factors,
    size_t start = 0,
    size_t step  = 1)
{
    if (nsamps == 1)
        return samps[start];
    std::complex<T> E_k = ct_fft_f(samps, nsamps / 2, factors + 1, start, step * 2);
    std::complex<T> O_k =
        ct_fft_f(samps, nsamps / 2, factors + 1, start + step, step * 2);
    return E_k + factors[0] * O_k;
}

//! Compute an FFT for a particular bin k using Cooley-Tukey
template <typename T>
std::complex<T> ct_fft_k(const std::complex<T>* samps, size_t nsamps, size_t k)
{
    // pre-compute the factors to use in Cooley-Tukey
    std::vector<std::complex<T>> factors;
    for (size_t N = nsamps; N != 0; N /= 2) {
        factors.push_back(std::exp(std::complex<T>(0, T(-2 * pi * k / N))));
    }
    return ct_fft_f(samps, nsamps, &factors.front());
}

//! Helper class to build a DFT plot frame
class frame_type
{
public:
    frame_type(size_t width, size_t height)
        : _frame(width - 1, std::vector<char>(height, ' '))
    {
        /* NOP */
    }

    // accessors to parts of the frame
    char& get_plot(size_t b, size_t z)
    {
        return _frame.at(b + albl_w).at(z + flbl_h);
    }
    char& get_albl(size_t b, size_t z)
    {
        return _frame.at(b).at(z + flbl_h);
    }
    char& get_ulbl(size_t b)
    {
        return _frame.at(b).at(flbl_h - 1);
    }
    char& get_flbl(size_t b)
    {
        return _frame.at(b + albl_w).at(flbl_h - 1);
    }

    // dimension accessors
    size_t get_plot_h(void) const
    {
        return _frame.front().size() - flbl_h;
    }
    size_t get_plot_w(void) const
    {
        return _frame.size() - albl_w;
    }
    size_t get_albl_w(void) const
    {
        return albl_w;
    }

    std::string to_string(void)
    {
        std::stringstream frame_ss;
        for (size_t z = 0; z < _frame.front().size(); z++) {
            for (size_t b = 0; b < _frame.size(); b++) {
                frame_ss << _frame[b][_frame[b].size() - z - 1];
            }
            frame_ss << std::endl;
        }
        return frame_ss.str();
    }

private:
    static const size_t albl_w = 6, flbl_h = 1;
    std::vector<std::vector<char>> _frame;
};

} // namespace

/***********************************************************************
 * Implementation code
 **********************************************************************/
namespace ascii_art_dft {

//! skip constants for amplitude and frequency labels
static const size_t albl_skip = 5, flbl_skip = 20;

template <typename T>
log_pwr_dft_type log_pwr_dft(const std::complex<T>* samps, size_t nsamps)
{
    if (nsamps & (nsamps - 1))
        throw std::runtime_error("num samps is not a power of 2");

    // compute the window
    double win_pwr = 0;
    std::vector<std::complex<T>> win_samps;
    for (size_t n = 0; n < nsamps; n++) {
        // double w_n = 1;
        // double w_n = 0.54 //hamming window
        //    -0.46*std::cos(2*pi*n/(nsamps-1))
        //;
        double w_n = 0.35875 // blackman-harris window
                     - 0.48829 * std::cos(2 * pi * n / (nsamps - 1))
                     + 0.14128 * std::cos(4 * pi * n / (nsamps - 1))
                     - 0.01168 * std::cos(6 * pi * n / (nsamps - 1));
        // double w_n = 1 // flat top window
        //    -1.930*std::cos(2*pi*n/(nsamps-1))
        //    +1.290*std::cos(4*pi*n/(nsamps-1))
        //    -0.388*std::cos(6*pi*n/(nsamps-1))
        //    +0.032*std::cos(8*pi*n/(nsamps-1))
        //;
        win_samps.push_back(T(w_n) * samps[n]);
        win_pwr += w_n * w_n;
    }

    // compute the log-power dft
    log_pwr_dft_type log_pwr_dft;
    for (size_t k = 0; k < nsamps; k++) {
        std::complex<T> dft_k = ct_fft_k(&win_samps.front(), nsamps, k);
        log_pwr_dft.push_back(
            float(+20 * std::log10(std::abs(dft_k)) - 20 * std::log10(T(nsamps))
                  - 10 * std::log10(win_pwr / nsamps) + 3));
    }

    return log_pwr_dft;
}

std::string dft_to_plot(const log_pwr_dft_type& dft_,
    size_t width,
    size_t height,
    double samp_rate,
    double dc_freq,
    float dyn_rng,
    float ref_lvl)
{
    if (dyn_rng <= 0.0) {
        throw std::runtime_error("dyn_rng must be greater than zero in dft_to_plot");
    }

    frame_type frame(width, height); // fill this frame

    // re-order the dft so dc in in the center
    const size_t num_bins = dft_.size() - 1 + dft_.size() % 2; // make it odd
    log_pwr_dft_type dft(num_bins);
    for (size_t n = 0; n < num_bins; n++) {
        dft[n] = dft_[(n + num_bins / 2) % num_bins];
    }

    // fill the plot with dft bins
    for (size_t b = 0; b < frame.get_plot_w(); b++) {
        // indexes from the dft to grab for the plot
        const size_t n_start = std::max(
            iround(double(b - 0.5) * (num_bins - 1) / (frame.get_plot_w() - 1)), 0);
        const size_t n_stop =
            std::min(iround(double(b + 0.5) * (num_bins - 1) / (frame.get_plot_w() - 1)),
                int(num_bins));

        // calculate val as the max across points
        float val = dft.at(n_start);
        for (size_t n = n_start; n < n_stop; n++)
            val = std::max(val, dft.at(n));

        const float scaled =
            (val - (ref_lvl - dyn_rng)) * (frame.get_plot_h() - 1) / dyn_rng;
        for (size_t z = 0; z < frame.get_plot_h(); z++) {
            static const std::string syms(".:!|");
            if (scaled - z >= 1)
                frame.get_plot(b, z) = syms.at(syms.size() - 1);
            else if (scaled - z > 0)
                frame.get_plot(b, z) = syms.at(size_t((scaled - z) * syms.size()));
        }
    }

    // create vertical amplitude labels
    const float db_step = to_clean_num(dyn_rng / (frame.get_plot_h() - 1) * albl_skip);
    for (float db = db_step * (int((ref_lvl - dyn_rng) / db_step));
         db <= db_step * (int(ref_lvl / db_step));
         db += db_step) {
        const int z =
            iround((db - (ref_lvl - dyn_rng)) * (frame.get_plot_h() - 1) / dyn_rng);
        if (z < 0 or size_t(z) >= frame.get_plot_h())
            continue;
        std::stringstream ss;
        ss << db;
        std::string lbl = ss.str();
        for (size_t i = 0; i < lbl.size() and i < frame.get_albl_w(); i++) {
            frame.get_albl(i, z) = lbl[i];
        }
    }

    // create vertical units label
    std::string ulbl = "dBfs";
    for (size_t i = 0; i < ulbl.size(); i++) {
        frame.get_ulbl(i + 1) = ulbl[i];
    }

    // create horizontal frequency labels
    const double f_step = to_clean_num(samp_rate / frame.get_plot_w() * flbl_skip);
    for (double freq = f_step * int((-samp_rate / 2 / f_step));
         freq <= f_step * int((+samp_rate / 2 / f_step));
         freq += f_step) {
        const int b =
            iround((freq + samp_rate / 2) * (frame.get_plot_w() - 1) / samp_rate);
        std::stringstream ss;
        ss << (freq + dc_freq) / 1e6 << "MHz";
        std::string lbl = ss.str();
        if (b < int(lbl.size() / 2)
            or b + lbl.size() - lbl.size() / 2 >= frame.get_plot_w())
            continue;
        for (size_t i = 0; i < lbl.size(); i++) {
            frame.get_flbl(b + i - lbl.size() / 2) = lbl[i];
        }
    }

    return frame.to_string();
}
} // namespace ascii_art_dft

/*

//example main function to test the dft

#include <curses.h>
#include <cstdlib>
#include <iostream>
#include <thread>
#include <chrono>

int main(void){
    using namespace std::chrono_literals;

    initscr();

    while (true){
        clear();

        std::vector<std::complex<float> > samples;
        for(size_t i = 0; i < 512; i++){
            samples.push_back(std::complex<float>(
                float(std::rand() - RAND_MAX/2)/(RAND_MAX)/4,
                float(std::rand() - RAND_MAX/2)/(RAND_MAX)/4
            ));
            samples[i] += 0.5*std::sin(i*3.14/2) + 0.7;
        }

        ascii_art_dft::log_pwr_dft_type dft;
        dft = ascii_art_dft::log_pwr_dft(&samples.front(), samples.size());

        printw("%s", ascii_art_dft::dft_to_plot(
            dft, COLS, LINES,
            12.5e4, 2.45e9,
            60, 0
        ).c_str());
	refresh();

        std::this_thread::sleep_for(1s);
    }


    endwin();
    std::cout << "here\n";
    return 0;
}

*/

#endif /*ASCII_ART_DFT_HPP*/
